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Data Structures (CS 1520)
Lecture 24
Name:________________
1. An AVL Tree is a special type of Binary Search Tree (BST) that it is height balanced. By height balanced I mean
that the height of every node’s left and right subtrees differ by at most one. This is enough to guarantee that a AVL
tree with n nodes has a height no worst than Olog2 n. Therefore, insertions, deletions, and search are worst case
Olog2 n . An example of an AVL tree with integer keys is shown below. The height of each node is shown.
3
50
2
1
30
60
0
1
0
9
34
80
0
0
32
47
Each AVL-tree node usually stores a balance factor in addition to its key and payload. The balance factor keeps track
of the relative height difference between its left and right subtrees, i.e., height(left subtree) - height(right subtree).
a) Label each node in the above AVL tree with one of the following balance factors:
0 if its left and right subtrees are the same height
1 if its left subtree is one taller than its right subtree
-1 if its right subtree is one taller than its left subtree
b) We start a put operation by adding the new item into the AVL as a leaf just like we did for Binary Search Trees
(BSTs). Add the key 90 to the above tree?
c) Identify the node “closest up the tree" from the inserted node (90) that no longer satisfies the height-balanced
property of an AVL tree. This node is called the pivot node. Label the pivot node above.
d) Consider the subtree whose root is the pivot node. How could we rearrange this subtree to restore the AVL height
balanced property? (Draw the rearranged tree below)
2
30
0
1
9
34
0
0
32
47
Lecture 24 Page 1
Data Structures (CS 1520)
Lecture 24
Name:________________
2. Typically, the addition of a new key into an AVL requires the following steps:
compare the new key with the current tree node’s key (as we did in the _put function called by the put
method in the BST) to determine whether to recursively add the new key into the left or right subtree
add the new key as a leaf as the base case(s) to the recursion
recursively (updateBalance method) adjust the balance factors of the nodes on the search path from the new
node back up toward the root of the tree. If we encounter a pivot node (as in question (c) above) we perform one or
two “rotations” to restore the AVL tree’s height-balanced property.
For example, consider the previous example of adding 90 to the AVL tree. Before the addition, the pivot node (60)
was already -1 (“tall right” - right subtree had a height one greater than its left subtree). After inserting 90, the pivot’s
right subtree had a height 2 more than its left subtree (balance factor -2) which violates the AVL tree’s height-balance
property. This problem is handled with a left rotation about the pivot as shown in the following generalized diagram:
Before the addition:
from parent
After the addition, but before rotation:
from parent
B
-1
D
0
D
-1
Rotate
Left at
TA Pivot
T
A
height
n-1
Recursive updateBalance method finds the pivot
and calls the rebalance method to perform proper rotation(s)
B
-2
TC
TE
height
n-1
height
n-1
height
n-1
T
C
height
n-1
(D's balance factor was already adjusted before
the pivot is found by the recursive updateBalance
method which moves toward the root)
T
E
height
n
After left rotation at pivot:
from parent
new
node
D
0
B
0
T
E
height
n
TA
TC
height
n-1
height
n-1
new
node
T1
a) Assuming the same initial AVL tree (upper, left-hand of above diagram) if the new node would have increased the
height of TC (instead of TE), would a left rotation about the node B have rebalanced the AVL tree?
Lecture 24 Page 2
Data Structures (CS 1520)
Lecture 24
Name:________________
b) Before the addition, if the pivot node was already -1 (tall right) and if the new node is inserted into the left subtree
of the pivot node's right child, then we must do two rotations to restore the AVL-tree’s height-balance property.
Before the addition:
After the addition, but before first rotation:
from parent
from parent
B
-1
Recursive updateBalance finds the pivot
and calls rebalance method to perform rotation(s)
B
-2
D's & F's balance factors have
already been adjusted before
F
the pivot was found
1
F
0
TA
TA
D
0
height
n-1
TC
TG
TE
height
n-2
D
-1
height
n-1
TC
height
n-2
height
n-1
height
n-2
1st Rotate
Right at
Node F T
G
TE
height
height
n-1
n-1
new
node
After the left rotation at pivot and
balance factors adjusted correctly:
from parent
After right rotation at F, but
before left rotation at pivot:
from parent
D
0
B
-2
B
1
F
0
T1
TA
TA
height
n-1
TC
height
n-2
TE
height
n-1
new
node
TG
height
n-1
height
n-1
Rotate
Left at
Pivot
D
-2
F
0
TC
height
n-2
TE
height
n-1
new
node
T
G
height
n-1
b) Suppose that the new node was added in TC instead of TE, then the same two rotations would restore the AVLtree’s height-balance property. However, what should the balance factors of nodes B, D, and F be after the rotations?
Lecture 24 Page 3
Data Structures (CS 1520)
Lecture 24
Name:________________
Consider the AVLTreeNode class that inherits and extends the TreeNode class to include balance factors.
from tree_node import TreeNode
class AVLTreeNode(TreeNode):
def __init__(self,key,val,left=None,right=None,parent=None, balanceFactor=0):
TreeNode.__init__(self,key,val,left,right,parent)
self.balanceFactor = balanceFactor
Now let’s consider the partial AVLTree class code that inherits from the BinarySearchTree class:
from avl_tree_node import AVLTreeNode
from binary_search_tree import BinarySearchTree
class AVLTree(BinarySearchTree):
def put(self,key,val):
if self.root:
self._put(key,val,self.root)
else:
self.root = AVLTreeNode(key,val)
self.size = self.size + 1
def _put(self,key,val,currentNode):
if key < currentNode.key:
if currentNode.hasLeftChild():
self._put(key,val,currentNode.leftChild)
else:
currentNode.leftChild = AVLTreeNode(key,val,parent=currentNode)
self.updateBalance(currentNode.leftChild)
else:
if currentNode.hasRightChild():
self._put(key,val,currentNode.rightChild)
else:
currentNode.rightChild = AVLTreeNode(key,val,parent=currentNode)
self.updateBalance(currentNode.rightChild)
def updateBalance(self,node):
if node.balanceFactor > 1 or node.balanceFactor < -1:
self.rebalance(node)
return
if node.parent != None:
if node.isLeftChild():
node.parent.balanceFactor += 1
elif node.isRightChild():
node.parent.balanceFactor -= 1
if node.parent.balanceFactor != 0:
self.updateBalance(node.parent)
def rotateLeft(self,rotRoot):
## NOTE: You will complete rotateRight
newRoot = rotRoot.rightChild
rotRoot.rightChild = newRoot.leftChild
if newRoot.leftChild != None:
newRoot.leftChild.parent = rotRoot
newRoot.parent = rotRoot.parent
if rotRoot.isRoot():
self.root = newRoot
else:
if rotRoot.isLeftChild():
rotRoot.parent.leftChild = newRoot
else:
rotRoot.parent.rightChild = newRoot
newRoot.leftChild = rotRoot
rotRoot.parent = newRoot
rotRoot.balanceFactor = rotRoot.balanceFactor + 1 - min(newRoot.balanceFactor, 0)
newRoot.balanceFactor = newRoot.balanceFactor + 1 + max(rotRoot.balanceFactor, 0)
def rebalance(self,node):
if node.balanceFactor < 0:
if node.rightChild.balanceFactor > 0:
self.rotateRight(node.rightChild)
self.rotateLeft(node)
else:
self.rotateLeft(node)
elif node.balanceFactor > 0:
if node.leftChild.balanceFactor < 0:
self.rotateLeft(node.leftChild)
self.rotateRight(node)
else:
self.rotateRight(node)
Lecture 24 Page 4
Data Structures (CS 1520)
Lecture 24
Name:________________
c) Trace the code for myBST.put(90)by updating the below diagram:
myBST BinarySearchTree object
size
root
50
1
60
30
9
80
34
32
-1
0
47
Consider balance factor formulas for rotateLeft. We know: newBal(B) = hA - hC and oldBal(B) = hA - (1+max(hC,
hE))
newBal(D) = 1+ max(hA, hC) - hE and oldBal(D) = hC - hE
Consider: newBal(B) - oldBal(B)
newBal(B) - oldBal(B) = hA - hC - hA + (1+max(hC, hE))
newBal(B) - oldBal(B) = 1 + max(hC, hE) - hC
newBal(B) - oldBal(B) = 1 + max(hC, hE) - hC
Before left rotation:
After left rotation at pivot:
newBal(B) = oldBal(B) + 1 + max(hC - hC, hE - hC)
rotRoot
newRoot
rotRoot
newBal(B) = oldBal(B) + 1 + max(0, -oldBal(D))
rotRoot
newBal(B) = oldBal(B) + 1 - min(0, oldBal(D)), so
B
D
rotRoot.balanceFactor = rotRoot.balanceFactor + 1 min(newRoot.balanceFactor, 0)
newRoot
TA
height
hA
Rotate
Left at
Pivot
B
D
T
TC
TE
height
hC
height
hE
E
height
hE
T
A
height
hA
d) Consider: newBal(D) - oldBal(D)
T
C
height
hC
T1
Lecture 24 Page 5
Data Structures (CS 1520)
Lecture 24
Name:________________
3. Complete the below figure which is a “mirror image” to the figure on page 2, i.e., inserting into the pivot’s left
child’s left subtree. Include correct balance factors after the rotation.
Before the insertion:
from parent
After the insertion, but before rotation:
from parent
D
1
D
2
B
0
B
1
TE
height
n-1
TA
TC
height
n-1
height
n-1
Rotate
Right at
Pivot TE
TA
TC
height
n
height
n-1
height
n-1
new
node
After right rotation at pivot:
T1
b) Complete the below figure which is a “mirror image” to the figure on page 3, i.e., inserting into the pivot’s left
child’s right subtree. Include correct balance factors after the rotation.
Before the insertion:
After the insertion, but before first rotation:
from parent
from parent
F
1
F
2
B
0
B
-1
TG
height
n-1
D
0
T
A
height
n-1
TC
height
n-2
T
E
height
n-2
TG
height
n-1
D
1
T
A
height
n-1
TC
height
n-1
T
E
height
n-2
new
node
After the right rotation at pivot and
balance factors adjusted correctly:
After left rotation at B, but
before right rotation at pivot:
T1
Lecture 24 Page 6
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